arXiv:2201.12951 Abstract | arXiv Analytics

arXiv:2201.12951 [math.AG]Abstract References Reviews Resources

Quantum $K$-theory of $G/P$ and $K$-homology of affine Grassmannian

Published 2022-01-31Version 1

This paper is the $K$-theoretic analogue of a recent new proof, given by the first named author, of Peterson-Lam-Shimozono's theorem via Savelyev's generalization of Seidel representations. The outcome is a new proof of Lam-Li-Mihalcea-Shimozono's conjecture, including its extension to the parabolic case, which was first verified by Kato.

Comments: Due to an unresolved dispute, this paper will not be published in any journal

Categories: math.AG, math.KT

Subjects: 14N15

Keywords: affine grassmannian, parabolic case, lam-li-mihalcea-shimozonos conjecture, theoretic analogue, seidel representations

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arXiv:2201.12951 [math.AG]Abstract References Reviews Resources

Quantum $K$-theory of $G/P$ and $K$-homology of affine Grassmannian

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arXiv:2201.12951 [math.AG]AbstractReferencesReviewsResources

Quantum $K$-theory of $G/P$ and $K$-homology of affine Grassmannian

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arXiv:2201.12951 [math.AG]Abstract References Reviews Resources